Add to ORKGWe find necessary and sufficient conditions for a sequence of sets E L ⊂ § d in order to obtain the inequality where 1 ⩽ p < +∞, Q L is any polynomial of degree smaller or equal than L, μ is a doubling measure, and the constant C p is independent of L. From this description, it follows an uncertainty principle for functions in L 2 (§ d ). We also consider weighted uniform versions of this result
AbstractLet q⩾1 be an integer, Sq be the unit sphere embedded in Rq+1, and μq be the volume element ...
For a polynomial p of degree n<N we compare two norms: �p �:=sup{|p(z) |:z ∈ C;|z|=1} and �p�N: =...
AbstractLet {γm}m=1∞be a sequence of positive numbers, and letf:Rd→Cbe a function such that for some...
We find necessary and sufficient conditions for a sequence of sets E L ⊂ § d in order to obtain the ...
We find necessary and sufficient conditions for a sequence of sets EL ⊂ Sd in order to obtain the in...
We investigate the uniform approximation provided by least squares polynomials on the unit Euclidean...
AbstractRecently, norm equivalences between spherical polynomials and their sample values at scatter...
In this paper, equivalence constants between various polynomial norms are calculated. As an applicat...
Abstract. Remez-type inequalities provide upper bounds for the uniform norms of polynomials on give...
AbstractUsing a ‘reasonable’ measure in P(2ℓ1n), the space of 2-homogeneous polynomials on ℓ1n, we s...
AbstractLet ƒ∈L2(Rn), ‖;ƒ‖2 = 1. Generalizing the Heisenberg uncertainty principle, lower bounds for...
AbstractIn one-dimensional case, various important, weighted polynomial inequalities, such as Bernst...
AbstractIn this paper we prove that there exists a constant C such that, if S,Σ are subsets of Rd of...
AbstractIn its simpler form, the Heisenberg–Pauli–Weyl inequality says that‖f‖24⩽C(∫Rn|x|2|f(x)|2dx)...
We consider the Banach space of two homogeneous polynomials endowed with the supremum norm parallel ...
AbstractLet q⩾1 be an integer, Sq be the unit sphere embedded in Rq+1, and μq be the volume element ...
For a polynomial p of degree n<N we compare two norms: �p �:=sup{|p(z) |:z ∈ C;|z|=1} and �p�N: =...
AbstractLet {γm}m=1∞be a sequence of positive numbers, and letf:Rd→Cbe a function such that for some...
We find necessary and sufficient conditions for a sequence of sets E L ⊂ § d in order to obtain the ...
We find necessary and sufficient conditions for a sequence of sets EL ⊂ Sd in order to obtain the in...
We investigate the uniform approximation provided by least squares polynomials on the unit Euclidean...
AbstractRecently, norm equivalences between spherical polynomials and their sample values at scatter...
In this paper, equivalence constants between various polynomial norms are calculated. As an applicat...
Abstract. Remez-type inequalities provide upper bounds for the uniform norms of polynomials on give...
AbstractUsing a ‘reasonable’ measure in P(2ℓ1n), the space of 2-homogeneous polynomials on ℓ1n, we s...
AbstractLet ƒ∈L2(Rn), ‖;ƒ‖2 = 1. Generalizing the Heisenberg uncertainty principle, lower bounds for...
AbstractIn one-dimensional case, various important, weighted polynomial inequalities, such as Bernst...
AbstractIn this paper we prove that there exists a constant C such that, if S,Σ are subsets of Rd of...
AbstractIn its simpler form, the Heisenberg–Pauli–Weyl inequality says that‖f‖24⩽C(∫Rn|x|2|f(x)|2dx)...
We consider the Banach space of two homogeneous polynomials endowed with the supremum norm parallel ...
AbstractLet q⩾1 be an integer, Sq be the unit sphere embedded in Rq+1, and μq be the volume element ...
For a polynomial p of degree n<N we compare two norms: �p �:=sup{|p(z) |:z ∈ C;|z|=1} and �p�N: =...
AbstractLet {γm}m=1∞be a sequence of positive numbers, and letf:Rd→Cbe a function such that for some...